We present a macroscopic traffic flow model where standard vehicles coexist with vehicles informed on the traffic distribution. The resulting mixed nonlocal-local integro-differential PDEs is proved to generate a locally Lipschitz continuous semigroup whose orbits are uniquely characterized as solutions to the system, according to a natural definition of solution. The norms and function spaces adopted are intrinsic to the different nature of the equations.
Colombo, R., Garavello, M., Nocita, C. (2026). Coexisting automated and human-driven vehicles: Well-posedness of a mixed nonlocal-local traffic model. JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 557(1 (1 May 2026)) [10.1016/j.jmaa.2025.130263].
Coexisting automated and human-driven vehicles: Well-posedness of a mixed nonlocal-local traffic model
Garavello M.;Nocita C.
2026
Abstract
We present a macroscopic traffic flow model where standard vehicles coexist with vehicles informed on the traffic distribution. The resulting mixed nonlocal-local integro-differential PDEs is proved to generate a locally Lipschitz continuous semigroup whose orbits are uniquely characterized as solutions to the system, according to a natural definition of solution. The norms and function spaces adopted are intrinsic to the different nature of the equations.
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